Graph States and the Variety of Principal Minors

Abstract

In Quantum Information theory, graph states are quantum states defined by graphs. In this work we exhibit a correspondence between graph states and the variety of binary symmetric principal minors, in particular their corresponding orbits under the action of SL(2, F2)× n Sn. We start by approaching the topic more widely, that is by studying the orbits of maximal abelian subgroups of the n-fold Pauli group under the action of Cnloc Sn, where Cnloc is the n-fold local Clifford group: we show that this action corresponds to the natural action of SL(2, F2)× n Sn on the variety Zn⊂ P( F22n) of principal minors of binary symmetric n× n matrices. The crucial step in this correspondence is in translating the action of SL(2, F2)× n into an action of the local symplectic group Sp2nloc( F2) on the Lagrangian Grassmannian LG F2(n,2n). We conclude by studying how the former action restricts onto stabilizer groups and stabilizer states, and finally what happens in the case of graph states.